A simple pendulum of length L = 0.2 m, is at its equilibrium position. At t = 0, the pendulum is given an initially velocity to the left (v_0< 0). The maximum angular displacement reached by the pendulum is e_max = 0.174 rad. The function that best describes the angular displacement as a function of time is given by: (g = %3D %3D 9.8 m/s^2)

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A simple pendulum of length L = 0.2 m, is at its equilibrium position. At t = 0, the pendulum is given an initially velocity to the left (v_0 < 0). The maximum angular displacement reached by the pendulum is e_max = 0.174 rad. The function that best describes the angular displacement as a function of time is given by: (g = %3D 9.8 m/s^2) O e(t) = 0.174cos(7t + n) O e(t) = 0.174cos(7t + T/2) 8(t) = 0.174cos(7t- n/2) %3D 8(t) = 0.087cos(7t- T/2) O e(t) = 0.087cos(7t - Tt) O 6(t) = 0.087cos(7t + n/2)